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Maximum norm error estimates of efficient difference schemes for second-order wave equations

✍ Scribed by Hong-lin Liao; Zhi-zhong Sun

Publisher
Elsevier Science
Year
2011
Tongue
English
Weight
351 KB
Volume
235
Category
Article
ISSN
0377-0427

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✦ Synopsis

The three-level explicit scheme is efficient for numerical approximation of the secondorder wave equations. By employing a fourth-order accurate scheme to approximate the solution at first time level, it is shown that the discrete solution is conditionally convergent in the maximum norm with the convergence order of two. Since the asymptotic expansion of the difference solution consists of odd powers of the mesh parameters (time step and spacings), an unusual Richardson extrapolation formula is needed in promoting the second-order solution to fourth-order accuracy. Extensions of our technique to the classical ADI scheme also yield the maximum norm error estimate of the discrete solution and its extrapolation. Numerical experiments are presented to support our theoretical results.

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